# Euler's Totient Function Game

$$\phi(n)$$ (read phi(n)) denotes how many positive integers which less or equal to $$n$$ that relatively prime with $$n$$. Let $$m$$ and $$x$$ be the positive integers which satisfy $$\phi(2015^{2015}) = m$$ and $$x =n(A)$$ which $$A = \{r | \phi(r) = 2015^{2015} , r \in N\}$$ Find the value of $mx$

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